Title of article
An upper bound for the minimum rank of a graph Original Research Article
Author/Authors
Avi Berman، نويسنده , , Shmuel Friedland and Uri N. Peled، نويسنده , , Leslie Hogben، نويسنده , , Uriel G. Rothblum، نويسنده , , Bryan Shader، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
10
From page
1629
To page
1638
Abstract
For a graph G of order n, the minimum rank of G is defined to be the smallest possible rank over all real symmetric n×n matrices A whose (i,j)th entry (for i≠j) is nonzero whenever {i,j} is an edge in G and is zero otherwise. We prove an upper bound for minimum rank in terms of minimum degree of a vertex is valid for many graphs, including all bipartite graphs, and conjecture this bound is true over for all graphs, and prove a related bound for all zero-nonzero patterns of (not necessarily symmetric) matrices. Most of the results are valid for matrices over any infinite field, but need not be true for matrices over finite fields.
Keywords
graph , matrix , Minimum rank , Maximum nullity , Delta conjecture , Minimum degree , Rank
Journal title
Linear Algebra and its Applications
Serial Year
2008
Journal title
Linear Algebra and its Applications
Record number
826094
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